Abstract:
We are engaged in classifying up to isomorphism of discrete subgroups of an affine transformation group on a plane (a two-dimensional space) preserving the Minkowski metric. It is proved that, for subgroups that do not coincide with Euclidean ones, the orbit of almost every point is everywhere dense.
Keywords:ornament group, affine transformation groups on a plane, pseudoeuclidean space, Minkowski plane, $Gamma$-equivalence, ergodic map.
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